A BSDE approach to Nash equilibrium payoffs for stochastic differential games with nonlinear cost functionals

Lin, Qian

doi:10.1016/j.spa.2011.08.011

Cited by 19 publications

(45 citation statements)

References 14 publications

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“…Recently, Lin [9,10] studied Nash equilibrium payoffs for stochastic differential games whose cost functionals are defined by doubly controlled BSDEs. Lin [9,10] generalizes the earlier result by Buckdahn, Cardaliaguet and Rainer [2]. In [9,10], the admissible control processes can depend on events occurring before the beginning of the stochastic differential game, thus, the cost functionals are not necessarily deterministic.…”

Section: Introductionmentioning

confidence: 99%

Nash equilibrium payoffs for stochastic differential games with reflection

Lin

2013

ESAIM: COCV

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Section: Introductionmentioning

confidence: 99%

Nash equilibrium payoffs for stochastic differential games with reflection

Lin

2013

ESAIM: COCV

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“…One method is related to partial differential equation (PDE) theory. Some of the results show that the payoff function of the game is the unique viscosity solution of a related Hamilton-Jacobi-Bellman-Isaacs equation, e.g., [26]. Other works make use of the Sobolev theory of PDEs (see [4,5,16,27], etc.)…”

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confidence: 99%

Bang–bang-type Nash equilibrium point for Markovian nonzero-sum stochastic differential game

Hamadène

2014

Comptes Rendus. Mathématique

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In this paper, we study a nonzero-sum stochastic differential game of bang-bang type in the Markovian framework. We show the existence of a Nash equilibrium point for this game. The main tool is the notion of backward stochastic differential equations which, in our case, are multidimensional with discontinuous generators with respect to z component.where B := (B s ) s≤T is a Brownian motion. Next with each player π i , i = 1, 2, is associated a payoff J i (u, v), i = 1, 2, given by:The objective is to find a pair (u * , v * ) which satisfy (1.

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“…In these works, the objectives are various and so are the approaches, usually based on partial differential equations (PDEs) ( [11,24]) or backward SDEs ( [16,17,18,23,22]). On the other hand, it should be pointed out that the frameworks in those papers are not the same.…”

Section: Introductionmentioning

confidence: 99%

“…Some of them consider strategies as control actions for the players (e.g. [4], [23], [28]) while others deal with the control against control setting (e.g. [13], [16,17,18]).…”

Section: Introductionmentioning

confidence: 99%

Existence of Nash equilibrium points for Markovian non-zero-sum stochastic differential games with unbounded coefficients

Hamadène

2014

Stochastics

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This paper is related to nonzero-sum stochastic differential games in the Markovian framework. We show existence of a Nash equilibrium point for the game when the drift is no longer bounded and only satisfies a linear growth condition. The main tool is the notion of backward stochastic differential equations which, in our case, are multidimensional with continuous coefficient and stochastic linear growth.

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A BSDE approach to Nash equilibrium payoffs for stochastic differential games with nonlinear cost functionals

Cited by 19 publications

References 14 publications

Nash equilibrium payoffs for stochastic differential games with reflection

Nash equilibrium payoffs for stochastic differential games with reflection

Bang–bang-type Nash equilibrium point for Markovian nonzero-sum stochastic differential game

Existence of Nash equilibrium points for Markovian non-zero-sum stochastic differential games with unbounded coefficients

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